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Arithmetic, you ADD the same number each time, eg. 2, 5, 8, 11 etc.

Geometric, you MULTIPLY by the same number each time, eg. 2, 6, 18, 54 etc.

Q: What is the difference between arithmetic and geometric progress series with example?

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The difference between arithmetic and geometric mean you can find in the following link: "Calculation of the geometric mean of two numbers".

The difference between arithmetic and geometric mean you can find in the following link: "Calculation of the geometric mean of two numbers".

They differ in formula.

The difference between arithmetic and geometric mean you can find in the following link: "Calculation of the geometric mean of two numbers".

You can find the differences between arithmetic and geometric mean in the following link: "Calculation of the geometric mean of two numbers".

In an arithmetic sequence the same number (positive or negative) is added to each term to get to the next term.In a geometric sequence the same number (positive or negative) is multiplied into each term to get to the next term.A geometric sequence uses multiplicative and divisive formulas while an arithmetic uses additive and subtractive formulas.

there is no difference between Mathematics and Arithmetic because Arithmetic is a branch of mathematics. there is no difference between Mathematics and Arithmetic because Arithmetic is a branch of mathematics.

To check whether it is an arithmetic sequence, verify whether the difference between two consecutive numbers is always the same.To check whether it is a geometric sequence, verify whether the ratio between two consecutive numbers is always the same.

The differences between arithmetic and geometric mean you can find in the following link: "Calculation of the geometric mean of two numbers". Cheers ebs

You can find the differences between arithmetic and geometric mean in the following link: "Calculation of the geometric mean of two numbers". Cheers ebs

Yes, with a difference of zero between terms. It is also a geometric series, with a ratio of 1 in each case.

This is a geometric sequence since there is a common ratio between each term. In this case, multiplying the previous term in the sequence by 10.